An (m,n)-colored mixed graph, or simply, an (m,n)-graph is a graph having m different types of arcs and n different types of edges. A homomorphism of an (m,n)-graph G to another (m,n)-graph H is a vertex mapping that preserves adjacency, the type thereto and the direction. A subset R of the set of vertices of G that always maps distinct vertices in itself to distinct image vertices under any homomorphism is called an (m,n)-relative clique of G. The maximum cardinality of an (m,n)-relative clique of a graph is called the (m,n)-relative clique number of the graph. In this article, we explore the (m,n)-relative clique numbers for various families of graphs.
翻译:(m,n) 彩色混合图,或简单(m,n)-图是一个图,图中含有不同类型的弧和不同类型的边缘。一个(m,n)-graph G对另一个(m,n)-graph H的同质性图是一个顶部映射图,保存相近性、其类型和方向。G的一组脊椎的一个子R,它总能将不同的脊椎本身映射为任何单一形态下不同的图像顶部,称为(m,n)-relictal clique of G。一个图的(m,n)-relectriquen-lectrique的最大基点叫做图形的(m,n)-relective cliquen 。在本文章中,我们探讨不同图表系列的(m,n)-restical crique number。
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